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Here's the question:
Solve the recurrence by obtaining a theta bound for T(n) given that T(1) = theta(1).

T(n) = n + T(n-3)

Attempted Solution:

T(n) = T(n-6) + (n-3) + n  

= T(n-9) + (n-6) + (n-3) + n  

= T(n-(n-1)) + [(n-n) + (n-(n-3)) + (n-(n-6)) + ... + n]

= T(1) + [0 + 3 + 6 + ... + n]

= theta(1) = 3[1 + 2 + 3 + ... + n/3]

= theta(1) + [(n/3)(n/3 + 1)]/2

= theta(1) + (n^2+3n)/6

When I double check to see if the solution fits the recurrence, it doesn't work. Been at this one for a while now; please halp T__T

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There must be a better place for this. All other 'recurrence relation' problems are closed 'off topic'. Mods, any ideas? –  new123456 Jan 29 '11 at 22:33
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@new123456: really? I only see one [recurrence-relation] question closed - that's hardly "all" of them. That said I'd tend to agree it is off topic - this smells like math to me... :) @sephy: perhaps math.stackexchange.com might be better? –  Mac Jan 29 '11 at 22:41
    
Thanks for the suggestions, I'll ask around in the math sections –  user595334 Jan 29 '11 at 22:46
    
Does the answer below solve the issue? If it doesn't I'll take another look at it. –  Varun Madiath Jan 30 '11 at 22:04
    
Thanks for the answer! It was certainly illuminating, the final answer was (4+n)*(n-1)/6; although I only got there from random guessing and checking and have no clue how that worked. –  user595334 Jan 30 '11 at 22:22
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1 Answer

up vote 1 down vote accepted

The issue was that you were getting the wrong summation. It doesn't start at 0, since your last T function was T(n - (n-1)) , which means previous one was T(n-(n-4)). So the summation starts at 4, and goes up till n.

If you don't know how to find the summation of this, I'd suggest you look at some of the proofs from the summation formula. This is what the solution looks like.

T(n) = T(n-3) + n  

= T(n-6) + (n-3) + n  

= T(n-(n-1)) + [ (n-(n-4)) + (n-(n-7)) + ... + n]

= T(1) + [4 + 7 + ... + n]

= theta(1) + (4 + n) * (n - 1)/6
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